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In order to deal with some set theoretical difficulties, we
assume the existence of sufficiently many universes.
LEMMA 5.3
Let
be an universe. Then the following statements hold.
- If
, then
.
- If
is a subset of
, then
.
- If
, then the ordered pair
is in
.
- If
, then
and
are in
.
- If
is a family of elements of
indexed
by an element
, then we have
.
less than the cardinality of
. In particular,
.
In this text we always assume the following.
For any set
, there always exists a universe
such that
.
The assumption above is related to a ``hard part'' of set theory.
So we refrain ourselves from arguing the ``validity" of it.
Note: The treatment in this subsection owes very much on those of
wikipedia:
http://en.wikipedia.org/wiki/Small_set_(category_theory)
and planetmath.org:
http://planetmath.org/encyclopedia/Small.html
but the treatment hear differs a bit from the treatments given there.
We also refer to [13] as a good reference.
Next: examples of categories.
Up: Elementary category theory
Previous: Elementary category theory
2007-12-11